Evaluate: limit as x approaches 0 of the function: (64x³ - 27)/(4x-3)

State the interval of continuity of f(x) = 1/(x-3)

What is an inflection point?

Derive: f(x) = (3x^3 - 4)/2

Evaluate: limit as x approaches 3/4 of the function: (64x3 - 27)/(4x-3)

Is f(x) = 5/(x^2 - 3x -10) continuous at x=-2? If not, state which condition(s) in which it fails.

How do we determine the maximum and minimum of f from f'?

Derive using the Product Rule: f(x) = (4x^2+3)(5x-1)

Simplify the answer

Evaluate: limit as x approaches positive infinity of the function: (3x - 5)/(square root of (5x^2 +1))

Where is the following function not continuous?

f(x) = 2x/(5 - e^(x+3))

Let f'(-1) = 100, f'(1) = -5 , f'(5) = 20

Let the critical points of the function f(x) be a = 0 and b = 2. Find the relative max and min of f(x).

Derive: y = sec(x) * cot(x). Simplify your answer.